Termination w.r.t. Q proof of /home/cern_httpd/provide/research/cycsrs/tpdb/TPDB-d9b80194f163/SRS_Standard/Waldmann_07

Termination w.r.t. Q of the given QTRS could be disproven:

0 QTRS

↳1 NonTerminationProof (⇒, 6558 ms)

↳2 NO

(0) Obligation:

Q restricted rewrite system:
The TRS R consists of the following rules:

Begin(a(c(x))) → Wait(Right1(x))
Begin(c(x)) → Wait(Right2(x))
Right1(b(End(x))) → Left(c(c(a(a(End(x))))))
Right2(b(a(End(x)))) → Left(c(c(a(a(End(x))))))
Right1(a(x)) → Aa(Right1(x))
Right2(a(x)) → Aa(Right2(x))
Right1(b(x)) → Ab(Right1(x))
Right2(b(x)) → Ab(Right2(x))
Right1(c(x)) → Ac(Right1(x))
Right2(c(x)) → Ac(Right2(x))
Aa(Left(x)) → Left(a(x))
Ab(Left(x)) → Left(b(x))
Ac(Left(x)) → Left(c(x))
Wait(Left(x)) → Begin(x)
a(x) → x
a(x) → b(b(x))
b(a(c(x))) → c(c(a(a(x))))
c(x) → x

Q is empty.

(1) NonTerminationProof (COMPLETE transformation)

We used the non-termination processor [OPPELT08] to show that the SRS problem is infinite.

Found the self-embedding DerivationStructure:

Wait Left c b a End → Wait Left c b a End

Wait Left c b a End → Wait Left c b a End
by OverlapClosure OC 3

Wait Left c b a End → Wait Left c b a a End
by OverlapClosure OC 2
Wait Left → Begin
by original rule (OC 1)
Begin c b a End → Wait Left c b a a End
by OverlapClosure OC 3
Begin c b a End → Wait Ac Left b a a End
by OverlapClosure OC 3
Begin c b a End → Wait Ac Ab Left a a End
by OverlapClosure OC 3
Begin c b a End → Wait Ac Ab Left c a a End
by OverlapClosure OC 3
Begin c b a End → Wait Ac Ab Left c c a a End
by OverlapClosure OC 2
Begin c b a End → Wait Ac Ab Right2 b a End
by OverlapClosure OC 3
Begin c b a End → Wait Ac Right2 b b a End
by OverlapClosure OC 3
Begin c b a End → Wait Right2 c b b a End
by OverlapClosure OC 3
Begin c b a End → Begin c c b b a End
by OverlapClosure OC 3
Begin c b a End → Begin c c a a End
by OverlapClosure OC 3
Begin c b a End → Wait Left c c a a End
by OverlapClosure OC 2
Begin c → Wait Right2
by original rule (OC 1)
Right2 b a End → Left c c a a End
by original rule (OC 1)
Wait Left → Begin
by original rule (OC 1)
a → b b
by original rule (OC 1)
Begin c → Wait Right2
by original rule (OC 1)
Right2 c → Ac Right2
by original rule (OC 1)
Right2 b → Ab Right2
by original rule (OC 1)
Right2 b a End → Left c c a a End
by original rule (OC 1)
c →
by original rule (OC 1)
c →
by original rule (OC 1)
Ab Left → Left b
by original rule (OC 1)
Ac Left → Left c
by original rule (OC 1)

a →
by original rule (OC 1)

(0) Obligation:

(1) NonTerminationProof (COMPLETE transformation)

(2) NO